Question
\( \begin{array}{ll}\text { 2) } \frac{65}{5}=\square & \text { 3) } \frac{51}{3}=\square \\ \text { 5) } \frac{72}{4}=\square & \text { 6) } \frac{94}{2}=\square \\ \text { 8) } \frac{87}{3}=\square \\ \text { 14) } \frac{50}{4}=\square \\ \text { 17) } \frac{78}{6}=\square\end{array} \)
Ask by Owen Wilson. in Sweden
Mar 09,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
\[
\begin{array}{ll}
2) \frac{65}{5} = 13 & 3) \frac{51}{3} = 17 \\
5) \frac{72}{4} = 18 & 6) \frac{94}{2} = 47 \\
8) \frac{87}{3} = 29 & 14) \frac{50}{4} = 12.5 \\
17) \frac{78}{6} = 13 \\
\end{array}
\]
Solution
**2) \(\frac{65}{5}\)**
We divide 65 by 5. Since \(5 \times 13 = 65\),
\[
\frac{65}{5}=13.
\]
**3) \(\frac{51}{3}\)**
We divide 51 by 3. Since \(3 \times 17 = 51\),
\[
\frac{51}{3}=17.
\]
**5) \(\frac{72}{4}\)**
We divide 72 by 4. Since \(4 \times 18 = 72\),
\[
\frac{72}{4}=18.
\]
**6) \(\frac{94}{2}\)**
We divide 94 by 2. Since \(2 \times 47 = 94\),
\[
\frac{94}{2}=47.
\]
**8) \(\frac{87}{3}\)**
We divide 87 by 3. Since \(3 \times 29 = 87\),
\[
\frac{87}{3}=29.
\]
**14) \(\frac{50}{4}\)**
We divide 50 by 4. \(4\) goes into \(50\) a non-integer number of times. In fact,
\[
\frac{50}{4}=12.5,
\]
or as an improper fraction,
\[
\frac{50}{4}=\frac{25}{2}.
\]
**17) \(\frac{78}{6}\)**
We divide 78 by 6. Since \(6 \times 13 = 78\),
\[
\frac{78}{6}=13.
\]
Answered by UpStudy AI and reviewed by a Professional Tutor
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Simplify this solution Extra Insights
To tackle these division problems, let’s break it down with some fun! Dividing is like sharing candies. If you have a certain number of candies and you want to share them equally among your friends, that’s what division is all about! For example, in \( \frac{65}{5} \), you’d have 65 candies and 5 friends, which means each friend gets 13 candies. Now, let’s look at some of the numbers you've got: when you calculate \( \frac{72}{4} \), think about how many times 4 fits into 72. Spoiler alert: it’s 18! Just whittle down each number and, with a little math magic, you’ll have your answers! Keep practicing, and before you know it, dividing will feel as easy as pie!
